Polyharmonic equations involving surface measures
Abstract
This article studies (optimal) W2m-1,∞-regularity for the polyharmonic equation (-)m u = Q \; Hn-1 , where is a (suitably regular) (n-1)-dimensional submanifold of Rn, Hn-1 is the Hausdorff measure, and Q is some suitably regular density. We extend findings in [9], where the second-order equation -div(A(x)∇ u) = Q \; Hn-1 is studied. As an application we derive (optimal) W3,∞-regularity for solutions of the biharmonic Alt-Caffarelli problem in two dimensions.
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